29477

Appears in sequences

• Numbers n such that n!8 + 2 is prime.at n=52A204663
• a(n) = 3*a(n-3) + a(n-2), a(0)=3, a(1)=0, a(2)=2.at n=20A231101
• Number of compositions of n into parts with multiplicity not larger than 4.at n=17A243082
• Expansion of Product_{k>=1} ((1 + k*x^k) / (1 + x^k)).at n=28A268500
• The number of partitions of n which represent Chomp positions with Sprague-Grundy value 9.at n=60A284782
• G.f.: A(x) = Sum_{n>=0} x^n*((1+x)^n + sqrt(A(x)))^n / (1 + x*sqrt(A(x))*(1+x)^n)^(n+1).at n=10A324963
• Number of partitions p of n such that (number of numbers in p that have multiplicity 1) >= (number of numbers in p having multiplicity > 1).at n=41A330145
• Number of integer partitions of n with no part divisible by all the others.at n=39A343341